Micronational Union of Twin Towns
Micronational Union of Twin Towns | ||
| ||
Logo of the Micronational Union of Twin Towns | ||
Headquarters | Azzurria, Most Serene Empire of Azzurria | |
Official language | English | |
Composition | ||
Twin Towns | 10 | |
Towns looking for a twin | 6 | |
Founding member | Most Serene Empire of Azzurria | |
Establishment | ||
Foundation | 28 October 2016 | |
Purposes Help world Micronations to improve relations with others by "twinning" some of their towns |
The Micronational Union of Twin Towns (MUTT) is an organization, founded in 2016 by the Most Serene Empire of Azzurria, with the purpose to help world Micronations to improve relations with others by "twinning" some of their towns.
Policy
The objectives that the MUTT advices to its members to follow are:
- Development of diplomacy and mutual recognitions between the main Micronations;
- Freedom of movement of goods and capitals, freedom of movement of peoples and their free travel, diplomatic and business VISA, between the twin towns;
- Develop friendly relations among twin towns, based on respect for the principle of equality between the twin towns;
- Promote economic and social cooperation;
- Promote respect for the human rights and fundamental freedoms for the benefit of all the humans and animals;
- Promote respect for international law and encourage the progressive development and its codification.
Towns looking for a twin town
Town | Micronation | Macronation | Contact info | Resident population | Area (km2) |
---|---|---|---|---|---|
Bugatnya | New Amsterdam | United Kingdom | 4 | 0.01 approx. | |
Azzurria | Most Serene Empire of Azzurria | Italy | 6 (winter), 1-3 (summer) | 0.0003112 | |
Balilla | Most Serene Empire of Azzurria | Italy | 1 | 0.00025839 | |
Pasqualia | Most Serene Empire of Azzurria | Italy | 0 (winter), 2 (summer) | 0.00098474 | |
San Pietropoli | Most Serene Empire of Azzurria | Italy | 0 (winter), 8 (summer) | 0.00011362 | |
Alderwick | Imperial Grand Duchy of Lundenwic | United Kingdom | Contact Details | 2 | unknown |
Bedfunta | Imperial Grand Duchy of Lundenwic | United Kingdom | Contact Details | 3 | unknown |
New Charter | Imperial Grand Duchy of Lundenwic | United Kingdom | Contact Details | 5 | unknown |
Oranje | Popular Union of Occitania | France | upoccitanie@mail.be | 2 | 0,040 |
Mewniland | Community of Mewniuvia | Portugal | mordecaimapper@gmail.com | 1 | 0.00061 |
Tomar | Templar Kingdom | Portugal | ginoscorpio@hotmail.com | N/A | N/A |
Current twin towns
Towns | Micronations | Macronations | Twinned since | Resident populations | Areas (km2) |
---|---|---|---|---|---|
Azzurria New Charter |
Most Serene Empire of Azzurria Imperial Grand Duchy of Lundenwic |
Italy United Kingdom |
9 November 2016 | 6 (winter), 1-3 (summer) 5 |
0.0003112 Unknown |
Azzurria Oranje |
Most Serene Empire of Azzurria Popular Union of Occitania |
Italy France |
10 November 2016 | 6 (winter), 1-3 (summer) 2 |
0.0003112 0.040 |
Pasqualia Alderwick |
Most Serene Empire of Azzurria Imperial Grand Duchy of Lundenwic |
Italy United Kingdom |
13 November 2016 | 0 (winter), 2 (summer) 2 |
0.00098474 Unknown |
Pasqualia Duchy of Victoria |
Most Serene Empire of Azzurria Grand Duchy of Letzembourg |
Italy United States |
25 November 2016 | 0 (winter), 2 (summer) 6 |
0.00098474 Unknown |
Farrar City Peacetown |
The Farrar Republic Democratic Nation of Duaktoserija |
England Serbia |
24 January 2017 | 4 ?? |
Unknown |
Peñiscola Erklrab City |
Templar Kingdom Huro-Atlantic Republic |
Spain United States |
May 2016 | N/A | Unknown |
How it works
Membership is currently granted freely, every Micronation is free to add its city/cities to the list of towns looking for a twin town, and it is supposed that Micronations interested in twinning their cities will contact themselves through the contact information leaved on the table.
When a twinning has been officialized, the Micronations can update the twinning on the relative table.
It is not required to remove, after have achieved a twinning, the cities from the list of twinning seekers, since there are no limits to achievable twinnings.