Overview of Allen’s
Interval Algebra
Allen’s interval algebra identifies 13 basic relations that are
distinct, exhaustive, and qualitative (Allen
1983). The algebra is defined for definite intervals whose
endpoints are single values. It can also be used with indefinite
intervals whose endpoints are not single values.
It is conventional to express an Allen relation with a notation that
indicates two intervals and a set of relations. For example, given
definite intervals A and B, where A precedes
B, their Allen relation can be represented as A(p)B.
Given indefinite intervals C and D, where C
starts before D starts and ends before D ends, an
Allen relation that expresses this incomplete information is
C(pmo)D. Note that the Allen set (pmo) in the relation of
C and D is a superset of the Allen set (p) in the
relation of A and B. In this circumstance, when two
Allen sets are related as superset/subset, the relation indicated by the
superset is weaker and the relation indicated by the subset is
stronger. An Allen relation thus provides a precise vocabulary
for characterizing the state of knowledge about the relation between two
intervals, regardless of whether the intervals are definite or
indefinite.
| precedes |
(p) |
(P) |
preceded by |
| meets |
(m) |
(M) |
met by |
| overlaps |
(o) |
(O) |
overlapped by |
| finished by |
(F) |
(f) |
finishes |
| contains |
(D) |
(d) |
during |
| starts |
(s) |
(S) |
started by |
| equals |
(e) |
|
|
It is often useful to visualize the basic Allen relations as a Nökel
lattice. In a Nökel lattice, the immediate neighbors of a relation
differ from it in the placement of a single interval end-point.
## Plot the basic Allen relations
par(mar = c(1, 1, 4, 1))
allen_illustrate("basic")
Analytic Inquiry with
the Algebra
Interval algebra is carried out with a composition function that
returns the relation of two intervals given their relations to a common
third interval. As implemented here, the function expects the relation
of one interval to the common interval and the relation of the common
interval to the remaining interval. The function also accepts a title
for the resulting Nokel lattice.
In this example, the composition function deduces that the interval
represented by a context inferior to a reference context precedes the
interval represented by a context superior to the reference context.
## Plot lattice for two contexts on the same line of a Harris matrix
par(mar = c(1, 1, 4, 1))
allen_analyze(
x = "m",
y = "m",
main = "Composite relation of two contexts on the same line"
)
The same lattice can be created with a convenience function.
## Illustrate composite relations in a stratigraphic sequence
par(mar = c(1, 1, 4, 1))
allen_illustrate("sequence")
Empirical Inquiry with
the Algebra
Empirical inquiry with Allen’s interval algebra compares intervals
estimated by Bayesian calibration of age determinations from Anglo-Saxon
female burials.
## Load the Anglo Saxon burials dataset
path <- system.file("burials.csv", package = "ArchaeoData")
burials <- read.table(path, header = TRUE, sep = ",", dec = ".",
check.names = FALSE)
#> Warning in file(file, "rt"): file("") accepte seulement open = "w+" et open = "w+b" : utilisation du premier
#> Error in read.table(path, header = TRUE, sep = ",", dec = ".", check.names = FALSE): pas de lignes disponibles dans l'entrée
## Coerce to event
burials <- as_events(burials, calendar = CE())
#> Error in h(simpleError(msg, call)): erreur d'�valuation de l'argument 'from' lors de la s�lection d'une m�thode pour la fonction 'as_events' : objet 'burials' introuvable
First, we check for the expected result of the identity relation by
comparing an interval with itself.
## Identify the burials with bead BE1-Dghnt
be1_dghnt <- c(
"UB-4503 (Lec148)", "UB-4506 (Lec172/2)", "UB-6038 (CasD183)",
"UB-4512 (EH091)", "UB-4501 (Lec014)", "UB-4507 (Lec187)",
"UB-4502 (Lec138)", "UB-4042 (But1674)", "SUERC-39100 (ERL G266)"
)
## Build phases
chains <- list("BE1-Dghnt" = be1_dghnt)
be1_dghnt_phase <- phases(burials, groups = chains)
#> Error in h(simpleError(msg, call)): erreur d'�valuation de l'argument 'x' lors de la s�lection d'une m�thode pour la fonction 'phases' : objet 'burials' introuvable
## Plot
par(mar = c(1, 1, 4, 1))
allen_observe(be1_dghnt_phase)
#> Error in h(simpleError(msg, call)): erreur d'�valuation de l'argument 'x' lors de la s�lection d'une m�thode pour la fonction 'allen_observe' : objet 'be1_dghnt_phase' introuvable
Next we compare the depositional histories of two bead types
recovered from well-dated Anglo Saxon female burials in England. Note
that the Allen relation and its converse are calculated.
## Identify the burials with bead BE1-CylRound
be1_cylround <- c(
"UB-4965 (ApD117)", "UB-4735 (Ber022)", "UB-4739 (Ber134/1)",
"UB-6473 (BuD250)", "UB-6476 (BuD339)", "UB-4729 (MH068)",
"UB-4835 (ApD134)", "UB-4708 (EH083)", "UB-4733 (MH095)",
"UB-4888 (MelSG089)", "UB-4963 (SPTip208)", "UB-4890 (MelSG075)",
"UB-4732 (MH094)", "SUERC-51539 (ERL G353)", "SUERC-51551 (ERL G193)"
)
## Build phases
chains <- list("BE1-Dghnt" = be1_dghnt, "BE1-CylRound" = be1_cylround)
be1_phase <- phases(burials, groups = chains)
#> Error in h(simpleError(msg, call)): erreur d'�valuation de l'argument 'x' lors de la s�lection d'une m�thode pour la fonction 'phases' : objet 'burials' introuvable
## Plot phase
par(mar = c(4, 6, 1, 1))
plot(be1_phase)
#> Error in h(simpleError(msg, call)): erreur d'�valuation de l'argument 'x' lors de la s�lection d'une m�thode pour la fonction 'plot' : objet 'be1_phase' introuvable
## Plot relations
par(mar = c(1, 1, 4, 1))
allen_observe(be1_phase, converse = TRUE)
#> Error in h(simpleError(msg, call)): erreur d'�valuation de l'argument 'x' lors de la s�lection d'une m�thode pour la fonction 'allen_observe' : objet 'be1_phase' introuvable
It can be useful to observe the frequency with which two intervals
are related according to the relations in an Allen set. For instance, we
might be interested in which of our two beads might be the trunk from
which the other branched. This can be done by observing the frequency
with which each bead type is related as row(oFD)col to the
other bead. The following code shows that BE1-CylRound is the better
trunk candidate.
allen_observe_frequency(be1_phase, set = "oFD")
#> Error in h(simpleError(msg, call)): erreur d'�valuation de l'argument 'x' lors de la s�lection d'une m�thode pour la fonction 'allen_observe_frequency' : objet 'be1_phase' introuvable
