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

You have chosen the moderate position on property rights and land ownership.\n<<set $prop to 2>>\n\n[[Return to Issues List|begin]]

----\n\n<u>OPTIONS</u>\n<font size=4>\n[[Negotiate DRAFT AGREEMENT|begin]]\n\n[[Consult with FACTIONS|parties]] \n\n[[See faction info|facinfo]]\n\nPossible consultations remaining: \n<<set $consleft to 4-$consult>><<if $consleft < 0>><<set $consleft to 0>><<endif>> <<print $consleft>>\n\n <b>[[PROPOSE DRAFT CONSTITUTION|vote]]</b> </font>

<center><font size=10>\nConflict in Cygnia </font> \n[img[swanflag 3]]</center>\n----\n<font size=3> Written and Designed by Nick Vaccaro\n----\n<<set $consult to 0>> <<set $over to 0>>\n<<set $elmin to 0>> <<set $south to 0>><<set $dismaj to 0>> <<set $pow to 0>> <<set $fed to 0>><<set $lang to 0>><<set $natres to 0>><<set $prop to 0>> <<set $score to 0>>\nYou are overseeing negotiations to design and create a new constitution for the country of Cygnia. \n\n\nYour goal is create a set of constitutional rules that can unify a divided society, and prevent a violent breakdown.\n\n<center> [[The Story So Far...|Intro2]]\n<font size=2>[[skip intro|begin]]</font></center>\n\n

[img[conflictgraph]]\n\n\nThe main groups are: \n<<continuelink "Continue">> \n\nThe <b>@@color:blue;ATRATI@@</b>: a minority of about 30% of the population, these people tended to live in the coastal areas, but also had a strong presence in the interior of the country. Under British rule,the @@color:blue;ATRATI@@ were generally better off economically than other groups, and were more likely to reside in urban areas and the capital city. \n\nIn the aftermath of independence, the @@color:blue;ATRATI@@ (being more educated, more likely to speak English, and closer to the centers of power) occupied most high positions in the government bureaucracy, and were able to claim ownership of a disproportionate amount of the country's valuable arable land. \n<<continuelink "Continue">> \n\nThe <b>@@color:red;OLORIANS@@</b>: The country's majority group, making up about 55% of the population, the @@color:red;OLORIANS@@ are traditionally a farming people (although many have moved to the cities in recent years). A large part of their population speaks the native Olorian language, and a significant percentage don't speak English well. The @@color:red;OLORIANS@@ have been generally economically worse off than the @@color:blue;ATRATI@@, both before and after independence.\n<<continuelink "Continue">> \n\nThe <b>@@color:green;MELANCONIANS@@</b>: Making up about 15% of the population, the @@color:green;MELANCONIANS@@ are a collection of tribes living in Melanconia, in the southern part of the country. These peoples mostly speak English, which has supplanted a variety of native languages. However, they have tended to resist being incorporated in the Cygnian state, and many favor autonomy or outright independence. \n\nOne of the reasons for this separatist sentiment is perceived cultural differences between the north and south of the country. Another reason is that Melanconia has substantial oil reserves under its territory, and many want to ensure that those reserves remain under local control.\n----\n\n[[Continue|Intro3]]\n

<<set $consult +=1>><<if $consult > 4>> There is no more time for additional consultations with political parties. You may make last revisions to the [[draft agreement|begin]], or [[present|vote]] it for a vote.<<endif>>\n<<if $consult <=4>> <<set $elmin to 0>> <<set $dismaj to 0>><<set $south to 0>><<if $pow eq 1>> <<set $elmin -=3>> <<set $dismaj +=3>><<set $south -=1>><<endif>><<if $pow eq 2>><<set $elmin +=1>><<set $dismaj -=0>><<set $south -=0>><<endif>><<if $pow eq 3>><<set $elmin +=4>><<set $dismaj -=4>><<set $south +=0>><<endif>><<if $fed eq 1>><<set $elmin -=1>> <<set $dismaj -=2>><<set $south +=3>><<endif>> <<if $fed eq 2>> <<set $elmin +=0>><<set $dismaj -=0>><<set $south -=1>><<endif>><<if $fed eq 3>> <<set $elmin +=1>><<set $dismaj +=1>><<set $south -=4>><<endif>><<if $natres eq 1>> <<set $elmin -=1>> <<set $dismaj +=3>> <<set $south -=3>><<endif>> <<if $natres eq 2>><<set $elmin +=2>> <<set $dismaj -=0>> <<set $south -=1>> <<endif>><<if $natres eq 3>><<set $elmin -=1>> <<set $dismaj -=2>> <<set $south +=3>><<endif>><<if $lang eq 1>> <<set $elmin +=2>><<set $dismaj -=3>><<set $south -=0>><<endif>> <<if $lang eq 2>><<set $elmin -=0>><<set $dismaj +=0>><<set $south -=0>><<endif>> \n<<if $lang eq 3>> <<set $elmin -=1>><<set $dismaj +=2>><<set $south +=0>><<endif>><<if $prop eq 1>> <<set $elmin -=3>><<set $dismaj +=3>> <<set $south -=1>><<endif>> \n<<if $prop eq 2>><<set $elmin +=1>><<set $dismaj -=0>> <<set $south -=0>><<endif>> <<if $prop eq 3>> <<set $elmin +=2>><<set $dismaj -=3>><<set $south -=0>><<endif>><center>POLITICAL FACTIONS</center>\n\n<b>@@color:blue;ATRATI@@</b> \n<<if $elmin <=-2>>Very Dissatisfied<<endif>> <<if $elmin < 0 and $elmin >-2>>Dissatisfied<<endif>> <<if $elmin is 0>>Satisfied<<endif>> <<if $elmin > 0 and $elmin < 3>> Satisfied<<endif>><<if $elmin >= 3>> Very Satisfied<<endif>>\n<b>@@color:red;OLORIANS@@</b> \n <<if $dismaj <= -2>>Very Dissatisfied<<endif>> <<if $dismaj< 0 and $dismaj > -2>>Dissatisfied<<endif>> <<if $dismaj is 0>>Satisfied<<endif>> <<if $dismaj > 0 and $dismaj < 3>> Satisfied<<endif>><<if $dismaj >= 3>> Very Satisfied<<endif>>\n<b>@@color:green;MELANCONIANS@@</b> \n<<if $south <= -2>>Very Dissatisfied<<endif>> <<if $south< 0 and $south> -2>>Dissatisfied<<endif>> <<if $south is 0>>Satisfied<<endif>> <<if $south > 0 and $south < 3>> Satisfied<<endif>><<if $south >= 3>> Very Satisfied<<endif>>\n\n<<endif>>\n\n[[Return to Issues List|begin]]

<<if $pow is 0 or $fed is 0 or $lang is 0 or $prop is 0 or $natres is 0>>You have not yet addressed all the main issues.\n\n[[Return to Issues List|begin]]<<else>> <<set $over to 1>><<set $elmin to 0>> <<set $dismaj to 0>><<set $south to 0>><<if $pow eq 1>> <<set $elmin -=3>> <<set $dismaj +=3>><<set $south -=1>><<endif>><<if $pow eq 2>><<set $elmin +=1>><<set $dismaj -=0>><<set $south -=0>><<endif>><<if $pow eq 3>><<set $elmin +=4>><<set $dismaj -=4>><<set $south +=0>><<endif>><<if $fed eq 1>><<set $elmin -=1>> <<set $dismaj -=2>><<set $south +=3>><<endif>> <<if $fed eq 2>> <<set $elmin +=0>><<set $dismaj -=0>><<set $south -=1>><<endif>><<if $fed eq 3>> <<set $elmin +=1>><<set $dismaj +=1>><<set $south -=4>><<endif>><<if $natres eq 1>> <<set $elmin -=1>> <<set $dismaj +=3>> <<set $south -=3>><<endif>> <<if $natres eq 2>><<set $elmin +=2>> <<set $dismaj -=0>> <<set $south -=1>> <<endif>><<if $natres eq 3>><<set $elmin -=1>> <<set $dismaj -=2>> <<set $south +=3>><<endif>><<if $lang eq 1>> <<set $elmin +=2>><<set $dismaj -=3>><<set $south -=0>><<endif>> <<if $lang eq 2>><<set $elmin -=0>><<set $dismaj +=0>><<set $south -=0>><<endif>> \n<<if $lang eq 3>> <<set $elmin -=1>><<set $dismaj +=2>><<set $south +=0>><<endif>><<if $prop eq 1>> <<set $elmin -=3>><<set $dismaj +=3>> <<set $south -=1>><<endif>> \n<<if $prop eq 2>><<set $elmin +=1>><<set $dismaj -=0>> <<set $south -=0>><<endif>> <<if $prop eq 3>> <<set $elmin +=2>><<set $dismaj -=3>><<set $south -=0>><<endif>>\nThe draft constitutional agreement leads to the following reactions from the negotiating parties:\n<<continuelink "Continue">> \n<b>@@color:blue;ATRATI@@</b> \n<<if $elmin <= -2>>The @@color:blue;ATRATI@@ are very unhappy with the final outcome. They grudgingly choose to accept it in the short term, but there are strong rumors that @@color:blue;ATRATI@@ officers within the military and bureaucracy are plotting a coup against the new government. If the newly empowered majority takes any action that would be seen as threatening to @@color:blue;ATRATI@@ interests (as seems almost certain), it will be very difficult to avoid a resumption of political violence.<<set $score -=3>><<endif>> <<if $elmin < 0 and $elmin> -2>>The @@color:blue;ATRATI@@ are generally dissatisfied with the final agreement, but are willing to accept it in the short term rather than see the government collapse. However, the prospects for long-term stability are dim.<<set $score -=1>><<endif>><<if $elmin is 0>>The @@color:blue;ATRATI@@ are generally satisfied with the outcome, and give it their approval. While they would have preferred more protection for the interests of their group, most @@color:blue;ATRATI@@ leaders recognize that this negotiated settlement is preferable to the breakdown of the political system. <<set $score +=1>><<endif>> <<if $elmin > 0 and $elmin < 3>>The @@color:blue;ATRATI@@ are generally satisfied with the outcome, and give it their approval. While they would have preferred more protection for the interests of their group, most @@color:blue;ATRATI@@ leaders recognize that this negotiated settlement is preferable to the breakdown of the political system.<<set $score +=1>><<endif>><<if $elmin >= 3>> The @@color:blue;ATRATI@@ are extremely pleased with the constitutional arrangements that have emerged from the discussions, and enthusiastically endorse the agreement<<set $score +=2>><<endif>>\n<<continuelink "Continue">> \n<b>@@color:red;OLORIANS@@</b> \n <<if $dismaj <= -2>>The @@color:red;OLORIANS@@ react to the proposed agreement with rage, believing that it repudiates their demands and ignores most of their concerns. The main Olorian parties pull out of the government and promise to boycott future elections, and large public protests and unrest emerge in Olorian areas. There are strong rumors of a military rebellion of junior Olorian officers.<<set $score -=5>><<endif>><<if $dismaj< 0 and $dismaj > -2>>The @@color:red;OLORIANS@@ are dissatisfied with this agreement. While one of their major political parties agrees to participate in the new government, a new more radical Olorian movement gains strength and demands a boycott of upcoming elections. Along with this split, there are rumblings that junior Olorian officers in the country's military may be plotting some sort of rebellion.<<set $score -=3>><<endif>><<if $dismaj is 0>>The @@color:red;OLORIANS@@ are generally satisfied with the outcome, and give it their approval.While some radical @@color:red;OLORIANS@@ are unhappy with concessions made to other groups, the overall opinion of the Olorian factions is cautiously optimistic.<<set $score +=2>><<endif>> <<if $dismaj > 0 and $dismaj < 3>> The @@color:red;OLORIANS@@ are generally satisfied with the outcome, and give it their approval.While some radical @@color:red;OLORIANS@@ are unhappy with concessions made to other groups, the overall opinion of the Olorian factions is cautiously optimistic.<<set $score +=2>><<endif>><<if $dismaj >= 3>> The @@color:red;OLORIANS@@ are extremely pleased with the new constitutional arrangement that has emerged from the negotiations, and give the new system their enthusiastic support.<<set $score +=3>><<endif>>\n<<continuelink "Continue">> \n<b>@@color:green;MELANCONIANS@@</b> \n<<if $south <= -2>>The @@color:green;MELANCONIANS@@ react to the proposed agreement with rage, believing that it repudiates their demands and ignores most of their concerns. The main Melanconian factions all throw their support to the insurgency, which builds in strength, and demands for outright independence become more common.<<set $score -=3>><<endif>> <<if $south< 0 and $south> -2>>The @@color:green;MELANCONIANS@@ are generally dissatisfied with this agreement. While some moderate Melanconian leaders and factions decide to cooperate with the new system in hopes of winning more concessions later, support for those moderates is weak among the Melanconian population. Instead, more radical leaders gain popularity, and the insurgency gains strength.<<set $score -=2>><<endif>> <<if $south is 0>>The @@color:green;MELANCONIANS@@ are generally satisfied with the outcome, and give it their approval; while they declare that they intend to push for more autonomy for their region, they are for now willing to do so through the political process. The Melanconian insurgent leaders declare a truce pending the implementation of the agreement in a constitution.<<set $score +=1>><<endif>><<if $south > 0 and $south < 3>> The Melaconians are generally satisfied with the outcome, and give it their approval; while they declare that they intend to push for more autonomy for their region, they are for now willing to do so through the political process. The Melanconian insurgent leaders declare a truce pending the implementation of the agreement in a constitution.<<endif>><<if $south >= 3>> The @@color:green;MELANCONIANS@@ are extremely pleased with the new constitutional arrangement that has emerged from the negotiations. The insurgent groups agree to begin working toward a lasting peace treaty, and the main Melanconian political factions promise to actively support and participate in upcoming elections.<<set $score +=3>><<endif>>\n<<set $finalscore to $score + 7>>\n<h1>SCORE: <<print $finalscore>></h1> <<endif>>\n\n

You have chosen a system of strong central government powers to pursue redistribution and reform of land ownership.\n<<set $prop to 1>>\n\n[[Return to Issues List|begin]]

The <b>@@color:blue;ATRATI@@</b> favor retaining English as the official national language; they may be open to some compromise, but would be opposed to changes that would eventually threaten English's status as the main language that unifies different groups in the country.\n\nThe <b>@@color:red;OLORIANS@@</b> want to grant their own language official status and promote its use in education, to help ensure that Olorian-speakers aren't marginalized.\n\nThe <b>@@color:green;MELANCONIANS@@</b> don't feel strongly about this issue.\n\n[[Return to Options|lang]]

\nYou have granted the central government control of natural resources.\n<<set $natres to 1>>\n[[Return to Issues List|begin]]

You have opted for a moderate form of federalism.\n<<set $fed to 2>>\n\n[[Return to Issues List|begin]]

You have chosen to remove references to official languages from the Constitution, leaving policy issues in this regard up to future governments.\n<<set $lang to 2>>\n[[Return to Issues List|begin]]

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http://android272.deviantart.com/art/RED-Background-394046129 - background

This involves the balance of power between the national government and the governments of the country's several provinces. Currently, the government inherited from colonial rule is strongly centralized, with most power being held by the national government, and provincial leaders having limited authority.\n\nThe options on the table are:\n\n[[Strong Federalism|confed]] - A system in which different provinces are mostly autonomous and control much taxing, spending, law, and internal security; the central government would be fairly weak.\n[[Moderate Federalism|fed]] - A system in which power is relatively evenly balanced between the central government and the government of the provinces, with the latter having the ability to collect some of their taxes and set provincial budgets, and to set some laws.\n[[Limited Federalism|weakfed]]- The current situation - a system in which the central government has most of the power, but the provincial governments have limited control over some local issues.\n\n\n[[SEE FACTION POSITIONS|federalpos]]\n\n[[Return to Issues List|begin]]

Some have argued that Cygnia needs an active program of land reform and redistribution of wealth in order to address inequalities within the population. What the constituion should say about this, if anything, is a matter of debate.\n\nThe options on the table are:\n\n[[Right to Redistribution and Land Reform|lowprop]]The constitution explicitly grants the central government the right to engage in redistribution and reform of land ownership and to nationalize productive resources in order to address economic needs and discrepancies within the population.\n[[Moderate property protections|midprop]] The current situation - the constitution recognizes a right to property, and specifies that any taking of land or other physical property for public use must involve full compensation for the owner.\n[[Strong property rights|hiprop]]The Constitution lays out strong property rights (backed up by an independent judiciary), and strongly limits the ability to confiscate property for redistribution or public use.\n\n[[SEE FACTION POSITIONS|proppos]]\n\n[[Return to Issues List|begin]]\n

The <b>@@color:blue;ATRATI@@</b> would prefer a stronger central government, but do not place as high a priority on this issue as they do on some others.\n\nThe <b>@@color:red;OLORIANS@@</b> also generally want to retain power in the national government, rather than distributing much power to the provinces.\n\nThe <b>@@color:green;MELANCONIANS@@</b> care deeply about this issue. They want as much authority and power for provincial governments as possible.\n\n[[Return to Options|federal]]

You have chosen a moderate amount of power-sharing.\n<<set $pow to 2>>\n\n[[Return to Issues List|begin]]

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

Conflict in Cygnia\n

You have chosen a form of government where the majority party can claim most of the political power within the executive branch.\n\n<<set $pow to 1>>\n\n[[Return to Issues List|begin]]

<<if $natres eq 3>> \nVery limited provincial powers are incompatible with regional control of natural resources. You must choose a different distribution of power, or alter the constitution's approach to natural resources.\n[[Return to Issues List|begin]]\n<<else>>\nYou have chosen to retain a strong central government, with little power for the provinces and regions.\n<<set $fed to 3>>\n[[Return to Issues List|begin]]<<endif>>\n

The <b>@@color:blue;ATRATI@@</b> favor strong legal protections for property rights. They argue that allowing the government to confiscate or redistribute land and productive resources would undermine economic growth, discourage investment, and make the entire country worse off.\n\nThe <b>@@color:red;OLORIANS@@</b> favor granting the central government the explicit right to pursue redistribution and land reform. They argue that the current distribution of wealth reflects unjust colonial arrangements, and that the country's long-term peace and well-being requires that the government be able to address these inequalities directly. \n\nThe <b>@@color:green;MELANCONIANS@@</b> don't want the central government to have strong constitutionally guaranteed rights to land redistribution, but aren't deeply committed on this single issue, and are fairly indifferent otherwise.\n\n[[Return to Options|prop]]

<<if $over is 1>>The game is over. Click "Restart" to play again.<<else>>\n Click on an issue to choose an option for the draft agreement. You may change the nature of the agreement as many times as you like, but the negotiations are under a limited time-frame. There is only sufficient time to consult <b>four times</b> with the different political factions about the current draft before presenting a final proposal.\n\n<font size = 6>Draft Agreement</font>\n----\n<b>[[Power-sharing|powshare]] </b> <<if $pow eq 1>>Little power-sharing<<endif>><<if $pow eq 2>>Moderate power-sharing measures<<endif>><<if $pow eq 3>>Substantial power-sharing guarantees<<endif>>\n----\n<b>[[Federalism |federal]]</b> <<if $fed eq 1>>Federation with weak central government<<endif>><<if $fed eq 2>>Moderate federalism with some regional authority<<endif>><<if $fed eq 3>>Limited federalism with strong central government<<endif>>\n----\n<b>[[Natural Resources|resources]]</b><<if $natres eq 1>>Central control of resources<<endif>><<if $natres eq 2>>No mention of this issue<<endif>><<if $natres eq 3>>Regional control of resources<<endif>>\n----\n<b>[[Language|lang]]</b><<if $lang eq 1>> English remains only official language<<endif>><<if $lang eq 2>>No official language<<endif>><<if $lang eq 3>>Multiple national languages may be used in administration and education<<endif>>\n----\n<b>[[Land Reform and Property Rights|prop]]</b><<if $prop eq 1>>Land reform and redistribution powers explicitly stated<<endif>><<if $prop eq 2>>Moderate protections for existing property<<endif>><<if $prop eq 3>>Strong property rights guaranteed in Constitution<<endif>>\n----\n<<endif>>\n\n

You have left this issue unresolved in the Constitution.<<set $natres to 2>>\n\n[[Return to Issues List|begin]]

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\n\n<font size=4>\n[[Negotiate DRAFT AGREEMENT|begin]]\n\n[[Consult with FACTIONS|parties]] \n\n[[See faction info|facinfo]]\n\nPossible consultations remaining: \n<<set $consleft to 4-$consult>><<if $consleft < 0>><<set $consleft to 0>><<endif>> <<print $consleft>>\n\n <b>[[PROPOSE DRAFT CONSTITUTION|vote]]</b> </font>\n\n----\n\n

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The main groups are: \n\nThe <b>@@color:blue;ATRATI@@</b>: a minority of about 30% of the population, these people tended to live in the coastal areas, but also had a strong presence in the interior of the country. Under British rule,the @@color:blue;ATRATI@@ were generally better off economically than other groups, and were more likely to reside in urban areas and the capital city. \n\nIn the aftermath of independence, the @@color:blue;ATRATI@@ (being more educated, more likely to speak English, and closer to the centers of power) were disproportionately likely to end up occupying positions in the government bureaucracy, and were able to claim ownership of a disproportionate amount of the country's land. \n\nThe <b>@@color:red;OLORIANS@@</b>: The country's majority group, making up about 55% of the population, the @@color:red;OLORIANS@@ are traditionally a farming people (although many have moved to the cities in recent years). A large part of their population speaks the native Olorian language, and a significant percentage don't speak English well. The @@color:red;OLORIANS@@ have been generally economically worse off than the @@color:blue;ATRATI@@, both before and after independence.\n\nThe <b>@@color:green;MELANCONIANS@@</b>: Making up about 15% of the population, the @@color:green;MELANCONIANS@@ are a collection of tribes living in Melanconia, in the southern part of the country. These peoples mostly speak English, which has supplanted a variety of native languages. However, they have tended to resist being incorporated in the Cygnian state, and many favor autonomy or outright independence. \n\nOne of the reasons for this separatist sentiment is perceived cultural differences between the north and south of the country. Another reason is that Melanconia has substantial oil reserves under its territory, and many want to ensure that those reserves remain under local control.\n----\n\n[[Return to Options|begin]]\n

This question involves the degree to which power-sharing measures ensure minority presence in government. Currently, the system is set up such that there is a high degree of power-sharing, in an effort to promote national unity. Every political party that gets more than 25% of the vote is guaranteed a vice-presidency that can veto legislation, preventing a majority from imposing its will on a majority. \n\nThe options on the table are.\n\n[[Little Power-Sharing|powlo]]The majority party can mostly dominate government, with no guaranteed representation for other parties in the executive branch.\n[[Moderate Power-Sharing|powmid]] Minority parties of significant size are guaranteed some representation in the cabinet, but no veto power over laws.\n[[Substantial Power-Sharing|powhigh]] - The current situation, with significant power-sharing guarantees for multiple political parties, and a veto power over laws for minority parties that receive more than 25% of the vote.\n\n[[SEE FACTION POSITIONS|powsharepos]]\n\n[[Return to Issues List|begin]]\n\n

[img[cygmap2]]\n\nFive years ago, the British colony of Cygnia became an independent state following a protracted anti-colonial struggle. The new state was somewhat united by a common language (English), but divided among several ethnic groups. \n\n[[Ethnic and regional identity|Intro2b]] soon became the major basis for political competition. \n\n

Following independence, a government of national unity including both @@color:red;OLORIANS@@ and @@color:blue;ATRATI@@ ruled Cygnia for several years. \n\nHowever, in recent months the main Olorian party has threatened to pull out of the government and push for a new constitution, claiming that the @@color:blue;ATRATI@@ are using their disproportionate influence within the bureacracy and the upper levels of the military to marginalize Olorian demands. Meanwhile, the @@color:green;MELANCONIANS@@ have little representation in the legislature, and a violent insurgency pushing for Melanconian autonomy or independence has begun to appear in the south.\n\nWith the country's political order and peace in jeopardy, negotiators from the three main groups have come together to try to hash out a new constitution. \n\nYour job is to design this agreement, taking into account the preferences and demands of each side. If it fails to gain widespread enough acceptance, the new country's future could be at risk.\n\n----\n[[Begin|begin]]\n----\n

<<set $fed to 1>>\n\nYou have opted for strong provincial governments and a weak central government.\n\n[[Return to Issues List|begin]]

Currently, English is the sole official language of the country, being used for all government business and a part of all public education. This status has been depicted by its advocates as a means to build national unity and promote economic efficiency.\n\nThe options on the table are:\n[[English as official language|nolang]] - The current situation: English is constitutionally specified as the official language of the country.\n[[No official language|weaklang]]No official language is specified in the Constitution; local governments can determine which language or languages will be used in administration and public education.\n[[Multiple official languages|stronglang]] The Olorian language is given official status alongside English. All government services must be available in both languages, and different provincial governments can determine which language or languages are used at different levels of education.\n\n\n[[SEE FACTION POSITIONS|langpos]]\n\n[[Return to Issues List|begin]]\n

You have chosen to maintain English as the official language.\n<<set $lang to 1>>\n\n[[Return to Issues List|begin]]

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

You have granted strong protections for property and limited the ability of government to nationalize and redistribute economic resources and land.\n<<set $prop to 3>>\n\n[[Return to Issues List|begin]]

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The <b>@@color:blue;ATRATI@@</b> would prefer that the constitution not grant either central or provincal governments power over natural resource revenues.\n\nThe <b>@@color:red;OLORIANS@@</b> want the central government to have the ability to develop and distribute revenues from natural resources, in order to help reduce poverty.\n\nThe <b>@@color:green;MELANCONIANS@@</b> strongly favor control of natural resources being granted to the regions where those resources reside.\n\n[[Return to options|resources]]

This involves the ownership of mineral and petroleum resources within the country, and the power to allocated revenues from those resources. Currently, the constitution does not mention this question, leaving it up for negotiation and decisions by the country's elected leaders.\n\n[[Central State Control of Natural Resources|stateowned]] - The country's natural resources are considered part of the national patrimony, and their stewardship and development is guaranteed to the central government in the constitution.\n[[Regional Control of Natural Resources|regionalowned]] - Control over natural resources, and the revenues from them, is allocated by the governments of the provinces where they are located.\n[[No mention|noresource]] - The current situation: No mention of ownership of resources and resource revenues in the Constitution; future political leaders will decide this question.\n\n[[SEE FACTION POSITIONS|resourcespos]]\n\n[[Return to Issues List|begin]]\n

You have chosen to grant official status to the native Olorian language alongside English.\n<<set $lang to 3>>\n[[Return to Issues List|begin]]

The <b>@@color:blue;ATRATI@@</b> believe that more power-sharing is better. They feel that their interests as a minority would be threatened in a system in which the majority party could rule on its own.\n\nThe <b>@@color:red;OLORIANS@@</b> believe that power-sharing has helped allow a privileged minority to retain too much power. Their biggest grievance is the current government's supposed lack of responsiveness to majority needs and demands; they prefer a system with more powers for the majority.\n\nThe <b>@@color:green;MELANCONIANS@@</b> would prefer some power-sharing, but it isn't the highest priority issue for them. They're most concerned about the balance of power between the center and the regions, rather than which parties have power within the national government (and don't see themselves benefiting greatly under the current power-sharing arrangement).\n\n[[Return to Options|powshare]]

<<if $fed > 2>>Regional control of natural resources requires a federal system with significant power for provincial governments, as opposed to the strong central government you've currently chosen\n[[Return to Issues List|begin]]\n<<else>>\nYou have granted control of natural resources to the provinces. <<set $natres to 3>>\n\n[[Return to Issues List|begin]]<<endif>>\n

You have chosen to maintain the current significant power-sharing guarantees.\n\n<<set $pow to 3>>\n[[Back to Issues List|begin]]