* using log directory 'd:/RCompile/CRANincoming/R-devel/npmv.Rcheck' * using R Under development (unstable) (2023-11-08 r85496 ucrt) * using platform: x86_64-w64-mingw32 * R was compiled by gcc.exe (GCC) 12.3.0 GNU Fortran (GCC) 12.3.0 * running under: Windows Server 2022 x64 (build 20348) * using session charset: UTF-8 * checking for file 'npmv/DESCRIPTION' ... OK * checking extension type ... Package * this is package 'npmv' version '2.4.0' * checking CRAN incoming feasibility ... WARNING Maintainer: 'Amanda Ellis ' Insufficient package version (submitted: 2.4.0, existing: 2.4.0) The Date field is over a month old. * checking package namespace information ... OK * checking package dependencies ... OK * checking if this is a source package ... OK * checking if there is a namespace ... OK * checking for hidden files and directories ... OK * checking for portable file names ... OK * checking serialization versions ... OK * checking whether package 'npmv' can be installed ... OK * checking installed package size ... OK * checking package directory ... OK * checking for future file timestamps ... OK * checking DESCRIPTION meta-information ... OK * checking top-level files ... NOTE Non-standard file/directory found at top level: 'cran-comments.md' * checking for left-over files ... OK * checking index information ... OK * checking package subdirectories ... OK * checking R files for non-ASCII characters ... OK * checking R files for syntax errors ... OK * checking whether the package can be loaded ... OK * checking whether the package can be loaded with stated dependencies ... OK * checking whether the package can be unloaded cleanly ... OK * checking whether the namespace can be loaded with stated dependencies ... OK * checking whether the namespace can be unloaded cleanly ... OK * checking loading without being on the library search path ... OK * checking use of S3 registration ... OK * checking dependencies in R code ... OK * checking S3 generic/method consistency ... OK * checking replacement functions ... OK * checking foreign function calls ... OK * checking R code for possible problems ... OK * checking Rd files ... NOTE checkRd: (-1) nonpartest.Rd:69: Lost braces; missing escapes or markup? 69 | \[H=(1/(a-1))*sum_{i=1}^a n (Rbar_{i .}-Rbar_{..})(Rbar_{i.}-Rbar_{..})' \] | ^ checkRd: (-1) nonpartest.Rd:69: Lost braces; missing escapes or markup? 69 | \[H=(1/(a-1))*sum_{i=1}^a n (Rbar_{i .}-Rbar_{..})(Rbar_{i.}-Rbar_{..})' \] | ^ checkRd: (-1) nonpartest.Rd:69: Lost braces; missing escapes or markup? 69 | \[H=(1/(a-1))*sum_{i=1}^a n (Rbar_{i .}-Rbar_{..})(Rbar_{i.}-Rbar_{..})' \] | ^ checkRd: (-1) nonpartest.Rd:69: Lost braces; missing escapes or markup? 69 | \[H=(1/(a-1))*sum_{i=1}^a n (Rbar_{i .}-Rbar_{..})(Rbar_{i.}-Rbar_{..})' \] | ^ checkRd: (-1) nonpartest.Rd:69: Lost braces; missing escapes or markup? 69 | \[H=(1/(a-1))*sum_{i=1}^a n (Rbar_{i .}-Rbar_{..})(Rbar_{i.}-Rbar_{..})' \] | ^ checkRd: (-1) nonpartest.Rd:70: Lost braces; missing escapes or markup? 70 | \[G=(1/(N-1))*sum_{i=1}^a sum_{j=1}^n(R_{ij}-Rbar_{i.})(R_{ij}-Rbar_{i.})'\] | ^ checkRd: (-1) nonpartest.Rd:70: Lost braces; missing escapes or markup? 70 | \[G=(1/(N-1))*sum_{i=1}^a sum_{j=1}^n(R_{ij}-Rbar_{i.})(R_{ij}-Rbar_{i.})'\] | ^ checkRd: (-1) nonpartest.Rd:70: Lost braces; missing escapes or markup? 70 | \[G=(1/(N-1))*sum_{i=1}^a sum_{j=1}^n(R_{ij}-Rbar_{i.})(R_{ij}-Rbar_{i.})'\] | ^ checkRd: (-1) nonpartest.Rd:70: Lost braces; missing escapes or markup? 70 | \[G=(1/(N-1))*sum_{i=1}^a sum_{j=1}^n(R_{ij}-Rbar_{i.})(R_{ij}-Rbar_{i.})'\] | ^ checkRd: (-1) nonpartest.Rd:70: Lost braces; missing escapes or markup? 70 | \[G=(1/(N-1))*sum_{i=1}^a sum_{j=1}^n(R_{ij}-Rbar_{i.})(R_{ij}-Rbar_{i.})'\] | ^ checkRd: (-1) nonpartest.Rd:70: Lost braces; missing escapes or markup? 70 | \[G=(1/(N-1))*sum_{i=1}^a sum_{j=1}^n(R_{ij}-Rbar_{i.})(R_{ij}-Rbar_{i.})'\] | ^ checkRd: (-1) nonpartest.Rd:75: Lost braces; missing escapes or markup? 75 | \[fhat_1=(tr(G)^2/tr(G^2)) and fhat_2= (a^2)/((a-1)sum^a_{i=1}(1)/(n_i-1))* fhat_1 | ^ checkRd: (-1) nonpartest.Rd:78: Lost braces; missing escapes or markup? 78 | \[U=tr[(a-1)H((N-a)G)^{-1}]\] Using the McKeon approximation the distribution of U is approximated by a "stretched" F distribution with degrees freedom K and D where: | ^ checkRd: (-1) nonpartest.Rd:83: Lost braces; missing escapes or markup? 83 | \[V= tr\{(a-1)H[(a-1)H+(N-a)G]^{-1}\}\] | ^ checkRd: (-1) nonpartest.Rd:92: Lost braces; missing escapes or markup? 92 | \[F_lambda=[(1-lambda^{1/t})/(lambda^{1/t})](df_2/df_1)\] | ^ checkRd: (-1) nonpartest.Rd:92: Lost braces; missing escapes or markup? 92 | \[F_lambda=[(1-lambda^{1/t})/(lambda^{1/t})](df_2/df_1)\] | ^ checkRd: (-1) nonpartest.Rd:98: Lost braces 98 | \[p(a-1)=2 then t=1, else t=sqrt{ (p^2(a-1)^2-4)/(p^2+(a-1)^2-5) }\] | ^ checkRd: (-1) ssnonpartest.Rd:64: Lost braces; missing escapes or markup? 64 | \[H=(1/(a-1))*sum_{i=1}^a n (Rbar_{i .}-Rbar_{..})(Rbar_{i.}-Rbar_{..})' \] | ^ checkRd: (-1) ssnonpartest.Rd:64: Lost braces; missing escapes or markup? 64 | \[H=(1/(a-1))*sum_{i=1}^a n (Rbar_{i .}-Rbar_{..})(Rbar_{i.}-Rbar_{..})' \] | ^ checkRd: (-1) ssnonpartest.Rd:64: Lost braces; missing escapes or markup? 64 | \[H=(1/(a-1))*sum_{i=1}^a n (Rbar_{i .}-Rbar_{..})(Rbar_{i.}-Rbar_{..})' \] | ^ checkRd: (-1) ssnonpartest.Rd:64: Lost braces; missing escapes or markup? 64 | \[H=(1/(a-1))*sum_{i=1}^a n (Rbar_{i .}-Rbar_{..})(Rbar_{i.}-Rbar_{..})' \] | ^ checkRd: (-1) ssnonpartest.Rd:64: Lost braces; missing escapes or markup? 64 | \[H=(1/(a-1))*sum_{i=1}^a n (Rbar_{i .}-Rbar_{..})(Rbar_{i.}-Rbar_{..})' \] | ^ checkRd: (-1) ssnonpartest.Rd:65: Lost braces; missing escapes or markup? 65 | \[G=(1/(N-1))*sum_{i=1}^a sum_{j=1}^n(R_{ij}-Rbar_{i.})(R_{ij}-Rbar_{i.})'\] | ^ checkRd: (-1) ssnonpartest.Rd:65: Lost braces; missing escapes or markup? 65 | \[G=(1/(N-1))*sum_{i=1}^a sum_{j=1}^n(R_{ij}-Rbar_{i.})(R_{ij}-Rbar_{i.})'\] | ^ checkRd: (-1) ssnonpartest.Rd:65: Lost braces; missing escapes or markup? 65 | \[G=(1/(N-1))*sum_{i=1}^a sum_{j=1}^n(R_{ij}-Rbar_{i.})(R_{ij}-Rbar_{i.})'\] | ^ checkRd: (-1) ssnonpartest.Rd:65: Lost braces; missing escapes or markup? 65 | \[G=(1/(N-1))*sum_{i=1}^a sum_{j=1}^n(R_{ij}-Rbar_{i.})(R_{ij}-Rbar_{i.})'\] | ^ checkRd: (-1) ssnonpartest.Rd:65: Lost braces; missing escapes or markup? 65 | \[G=(1/(N-1))*sum_{i=1}^a sum_{j=1}^n(R_{ij}-Rbar_{i.})(R_{ij}-Rbar_{i.})'\] | ^ checkRd: (-1) ssnonpartest.Rd:65: Lost braces; missing escapes or markup? 65 | \[G=(1/(N-1))*sum_{i=1}^a sum_{j=1}^n(R_{ij}-Rbar_{i.})(R_{ij}-Rbar_{i.})'\] | ^ checkRd: (-1) ssnonpartest.Rd:70: Lost braces; missing escapes or markup? 70 | \[fhat_1=(tr(G)^2/tr(G^2)) and fhat_2= (a^2)/((a-1)sum^a_{i=1}(1)/(n_i-1))* fhat_1 | ^ checkRd: (-1) ssnonpartest.Rd:73: Lost braces; missing escapes or markup? 73 | \[U=tr[(a-1)H((N-a)G)^{-1}]\] Using the McKeon approximation the distribution of U is approximated by a "stretched" F distribution with degrees freedom K and D where: | ^ checkRd: (-1) ssnonpartest.Rd:78: Lost braces; missing escapes or markup? 78 | \[V= tr\{(a-1)H[(a-1)H+(N-a)G]^{-1}\}\] | ^ checkRd: (-1) ssnonpartest.Rd:87: Lost braces; missing escapes or markup? 87 | \[F_lambda=[(1-lambda^{1/t})/(lambda^{1/t})](df_2/df_1)\] | ^ checkRd: (-1) ssnonpartest.Rd:87: Lost braces; missing escapes or markup? 87 | \[F_lambda=[(1-lambda^{1/t})/(lambda^{1/t})](df_2/df_1)\] | ^ checkRd: (-1) ssnonpartest.Rd:93: Lost braces 93 | \[p(a-1)=2 then t=1, else t=sqrt{ (p^2(a-1)^2-4)/(p^2+(a-1)^2-5) }\] | ^ * checking Rd metadata ... OK * checking Rd line widths ... OK * checking Rd cross-references ... OK * checking for missing documentation entries ... OK * checking for code/documentation mismatches ... OK * checking Rd \usage sections ... OK * checking Rd contents ... OK * checking for unstated dependencies in examples ... OK * checking contents of 'data' directory ... OK * checking data for non-ASCII characters ... OK * checking data for ASCII and uncompressed saves ... OK * checking examples ... OK * checking PDF version of manual ... [13s] OK * checking HTML version of manual ... OK * DONE Status: 1 WARNING, 2 NOTEs