• 検索結果がありません。

学術雑誌掲載論文等

N/A
N/A
Protected

Academic year: 2018

シェア "学術雑誌掲載論文等"

Copied!
16
0
0

読み込み中.... (全文を見る)

全文

Loading

Fig. 2. Sites of rabies injections in the PMv, distribution of rabies-labeled neurons in TRN, histological reconstructions of recording sites, and locations of visual-, set-, and movement-related neurons
Fig. 3. Four examples of TRN neurons. (A) A neuron showing spatially non-selective visual- and movement-related activity
Table 3. Timing of activity modulation of visual-related neurons in TRN and PMv (criterion = 25% of peak)
Fig. 6. Population activity of spatially selective neurons. (A) Population activity (mean   SEM) of visual-related TRNrd neurons for preferred (green) and 6 non-preferred (black) positions
+3

参照

関連したドキュメント

We present sufficient conditions for the existence of solutions to Neu- mann and periodic boundary-value problems for some class of quasilinear ordinary differential equations.. We

In Section 13, we discuss flagged Schur polynomials, vexillary and dominant permutations, and give a simple formula for the polynomials D w , for 312-avoiding permutations.. In

Analogs of this theorem were proved by Roitberg for nonregular elliptic boundary- value problems and for general elliptic systems of differential equations, the mod- ified scale of

Then it follows immediately from a suitable version of “Hensel’s Lemma” [cf., e.g., the argument of [4], Lemma 2.1] that S may be obtained, as the notation suggests, as the m A

Definition An embeddable tiled surface is a tiled surface which is actually achieved as the graph of singular leaves of some embedded orientable surface with closed braid

The proof uses a set up of Seiberg Witten theory that replaces generic metrics by the construction of a localised Euler class of an infinite dimensional bundle with a Fredholm

Correspondingly, the limiting sequence of metric spaces has a surpris- ingly simple description as a collection of random real trees (given below) in which certain pairs of

[Mag3] , Painlev´ e-type differential equations for the recurrence coefficients of semi- classical orthogonal polynomials, J. Zaslavsky , Asymptotic expansions of ratios of