The dating and updating of the TRINPsite documents is done on the basis
of a novel Year-Week-Day system, which is actually a 'Year- Week-
Fixed Week Day' system. In this timekeeping system each day is represented
by the following type of code consisting of three numbers:
12.34.5. Such a Y.W.D. code is shorter than those used in the
traditional day-month-year and month-day-year systems, which
need 4 instead of 3 digits to record the day of the year.
While it is neither shorter nor longer than an alternative
year-day system in which the days would be numbered from 1
to 366, it has, as will become clear, the great advantage of directly
relating the day of the year not only to the week of the year but,
more importantly, to the day of the week as well.
No other system of notation makes sense than one in which a
larger unit consistently precedes a smaller unit in the way
in which thousands come before hundreds and hundreds, in
turn, before tens. Therefore the first number in the Y.W.D.
code refers to the largest unit of time used here, that is
the year. This year number is not based on any
religious ethnically, territorially or otherwise exclusivist
calendar. Instead it is based on an event which is of
international significance and recognized as real by all
regardless of religious, nonreligious or political
persuasion. Such an event is the end of the Second World War
and provisionally (not ultimately!) year 1 is taken to be the first
whole calendar year after the end of that global war. This site was
started in the year 50 ASWW, that is, 50 years after the end of
the Second World War.
The second number in the Y.W.D. code refers to the week of the
year, and the third number to the day of the week, both in accordance
with the global Quaternary Metric Calendar. This is a perpetual
calendar in that the years are uniform in the correspondence of days
of the week and dates. Moreover, it is transparently perpetual
in that the day of the week is part of the date, and therefore
immediately visible, at least when using the Year-Week-Day code. It
is also possible to use a Year-Month-Day code in combination with the
Metric Calendar. Such a code, however, is one digit longer, if using
the number of the month (1-13), and even two digits longer, if using
the abbreviation for its name (NEY-SLL). It will be immediately
clear in which month the date falls, but for the 8th to the 28th day
of the month the day of the week is not as transparent as in the
Y.W.D. code, altho fixed and still easy to find by subtracting
7, 14 or 21 days. In the document Go Global, Go
Metric! you can see today's date both in Y.W.D. and in
Y.M.D. notation.
The Quartenary Metric Calendar was introduced in
section 5.2.1 of the Book of Symbols of
the Model of Neutral-Inclusivity in the 41st
year ASWW. In that section it is also explained what defines the true
and inclusive year 1. At the moment the inauguration of that era is
still an event to be looked forward to.
Conversion between the new, Metric Calendar and the old,
religious-imperial calendar is not a matter of exact one-to-one
correspondence as in the case of the conversion between,
for example, metric liters and imperial gallons. A religious-imperial
leap year with 29 days in the second month, or an ASWW leap year with
29 days in the thirteenth and last month, will affect this
correspondence, especially since such a religious-imperial leap year
never coincides with an ASWW leap year. Moreover, the first day of
the Metric Calendar will only be '22 December' if that is indeed the
first whole 24-hour day after the Northern winter solstice; otherwise
the Metric New Year`s day will fall earlier or later on the
religious-imperial calendar. Nevertheless, the variation is not going
to be more than one, or perhaps sometimes two days, and for the time
being the following conversion table will be used for the week and day
numbers:
|>>>>>>>>>>>>>>>>>>>>>>>>>>>>>DNIF<<<<<<<<<<<<<<<<<<<<<<<<<<<<<|
| |
| |
| NEW, METRIC CALENDAR OLD, RELIGIOUS-IMPERIAL |
| CALENDAR |
| |
| month week |
| (normally 28 days) (normally 7 days) |
| |
| 1 NEY Northern Early Yule 1 22-28 December |
| 2 29 December-4 January |
| 3 5-11 January |
| 4 12-18 January |
| 2 NMY Northern Mid-Yule 5 19-25 January |
| 6 26 January-1 February |
| 7 2-8 February |
| 8 9-15 February |
| 3 NLY Northern Late Yule 9 16-22 February |
| 10 23 February-1 March |
| 11 2-8 March* |
| 12 9-15 March |
| 4 NEM Northern Equinoctial 13 16-22 March |
| 14 23-29 March |
| 15 30 March-5 April |
| 16 6-12 April |
| 5 NML Northern Mid-Lent 17 13-19 April |
| 18 20-26 April |
| 19 27 April-3 May |
| 20 4-10 May |
| 6 NLL Northern Late Lent 21 11-17 May |
| 22 18-24 May |
| 23 25-31 May |
| 24 1-7 June |
| 7 EQU Equatorial (Month) 25 8-14 June |
| (29 days) 26 15-22 June (8 days) |
| 27 23-29 June |
| 28 30 June-6 July |
| 8 SEY Southern Early Yule 29 7-13 July |
| 30 14-20 July |
| 31 21-27 July |
| 32 28 July-3 August |
| 9 SMY Southern Mid-Yule 33 4-10 August |
| 34 11-17 August |
| 35 18-24 August |
| 36 25-31 August |
| 10 SEM Southern Equinoctial 37 1-7 September |
| 38 8-14 September |
| 39 15-21 September |
| 40 22-28 September |
| 11 SEL Southern Early Lent 41 29 September-5 October |
| 42 6-12 October |
| 43 13-19 October |
| 44 20-26 October |
| 12 SML Southern Mid-Lent 45 27 October-2 November |
| 46 3-9 November |
| 47 10-16 November |
| 48 17-23 November |
| 13 SLL Southern Late Lent 49 24-30 November |
| (29 days 50 1-7 December |
| in leap years) 51 8-14 December |
| 52 15-21 December* |
| |
| |
|>>>>>>>>>>>>>>>>>>>>>>>>>>>>>MVVM<<<<<<<<<<<<<<<<<<<<<<<<<<<<<|
(* in leap years weeks 11 thru 52 start one day earlier)
The Metric year can be divided into as many as thirteen parts, when
each month is considered separately, but it can also be divided into
no more than three parts: Northern (that is, the period of the six
Northern months), Equatorial and Southern (the period of the six
Southern months). In addition to the separate months and these
periods it is possible to distinguish Northern Yule (the period of the three
Northern Yule months), Northern Lent (that of the two Northern Lent
months), Southern Yule (that of the two Southern Yule months) and
Southern Lent (that of the three Southern Lent months).
The above system deviates from the one presented in the
Model of Neutral-Inclusivity in that every year has an extra
day at the end of the second quarter, and that only leap
years have a (second) extra day at the end of the fourth and
last quarter. This minor deviation can be justified for two
reasons. Firstly, it means that the intercalary extra day in
a leap year does not affect the regular succession of days,
of which the eight-day 26th week has become an integral and
fixed part. And secondly, the fixed extra day is now exactly
in the middle of the year in Equatorial Month, so that at
least in standard years the balance between Northern and
Southern months is fully maintained. This is what both
catenical neutrality and planetary
inclusivity require.