|
phenotype of
|
RO_0002201 |
[inverse of has phenotype] |
|
phenotype_rcn
|
phenotype_rcn |
|
|
phenotype_slim_wb
|
phenotype_slim_wb |
|
|
phenotypeslim_cerevisiae
|
phenotypeslim_cerevisiae |
|
|
phosphorylates
|
RO_0002447 |
|
|
plural form
|
plural_form |
|
|
plural term
|
PLURAL |
|
|
plural term
|
PLURAL |
|
|
positively correlated with
|
RO_0017003 |
[A relation between entities in which one increases or decreases as the other does the same.] |
|
positively regulated by
|
RO_0002336 |
[inverse of positively regulates] |
|
positively regulates
|
RO_0002213 |
[Process(P1) postively regulates process(P2) iff: P1 initiates P2, or P1 increases the the frequency of initiation of P2 or the magnitude or rate of output of P2., x positively regulates y if and only if the progression of x increases the frequency, rate or extent of y, p positively regulates q iff p regulates q, and p increases the rate or magnitude of execution of q.] |
|
positively regulates characteristic
|
RO_0019001 |
[A relationship that holds between a process and a characteristic in which process (P) positively regulates characteristic (C) iff: P results in an increase in the intensity or magnitude of C.] |
|
possible_exception
|
possible_exception |
|
|
postaxialmost part of
|
BSPO_0001115 |
|
|
posteriorly connected to
|
posteriorly_connected_to |
[x posteriorly_connected_to y iff the posterior part of x is connected to y. i.e. x connected_to y and x anterior_to y.] |
|
preaxialmost part of
|
BSPO_0001113 |
|
|
preceded by
|
preceded_by |
|
|
preceded by
|
BFO_0000062 |
[X preceded_by Y iff: end(Y) before_or_simultaneous_with start(X)., X preceded_by Y iff: end(Y) before_or_simultaneous_with start(X), x is preceded by y if and only if the time point at which y ends is before or equivalent to the time point at which x starts. Formally: x preceded by y iff ω(y) <= α(x), where α is a function that maps a process to a start point, and ω is a function that maps a process to an end point.] |
|
preceded_by
|
preceded_by |
|
|
precedes
|
BFO_0000063 |
[x precedes y if and only if the time point at which x ends is before or equivalent to the time point at which y starts. Formally: x precedes y iff ω(x) <= α(y), where α is a function that maps a process to a start point, and ω is a function that maps a process to an end point.] |
