I have a table that has the following indexes:
IXC clustered index that includes a single column: A asc.
IX1 That includes two columns: A asc, B asc.
In this case, ICX looks like a duplicate index of IX1. Is it a good idea to eliminate ICX and make IX1 the clustered index in that case? Or are there scenarios in which this would be a bad idea?
my CSS does not work to place the bar in the part of the page
Hi, I just noticed that my wordpress located at www.strategygroupng.org was automatically updated, and that has caused me problems, the logo and the menu are hidden under a white overlay, although I observed this problem in a Chrome web browser. In other browsers, the website is simply nice. This is the screenshot of my normal website 
This is the screenshot of the website with the white overlay that hides my menu and my logo. 
I have inspected and played with some CSS code to try to solve the problem, but there is no solution. Kindly help thanks. website address www.strategygroupng.org/
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I used to use Ubuntu for my development environment, since I have a new workstation that I have decided to switch to Manjaro, with a KDE GUI.
When I used Gnome, I used a tool called xrandr-extend to give me the ability to use both the 4k screen of my laptop and my external 1080p screen without suffering from the usual scaling problems. It works well; I had no problems with xrandr-extend in Gnome. In Manjaro, however, I have a problem that I cannot solve.
The problem lies in the desktop on the external screen:
As you can see, three quarters of the screen are black, while the desk accommodates the last quarter of the screen.
I think it may have something to do with the fact that I am compressing the screen by 2 in the xrandr-extend configuration. I am doing this to achieve the optimum degree of scale to use applications on the screen. However, if this is the case, how can I maintain the level of scale that I need while the entire desktop instance on the external screen covers the entire width and length of that screen?
To my knowledge, I have filled in the configuration file correctly:
[provider:modesetting]
primary = eDP-1
hdmi = HDMI-1
vga = DP-1
[provider:nouveau]
primary = eDP1
hdmi = HDMI1
vga = DP1
[resolutions]
primary = 3840, 2180
hdmi = 1920, 1080
vga = 1920, 1200
[scaling]
hdmi = 2
The console logs generated when I execute the command to extend and scale the external screen:
[dukejm@duke-pc ~]$ xrandr-extend -n hdmi
xrandr --auto
xrandr --listmonitors
xrandr --output eDP1 --auto --output HDMI1 --auto --panning 3840x2160+3840+0 --scale 2.0x2.0 --right-of eDP1
Monitors: 2
0: +*eDP1 3840/350x2160/190+0+0 eDP1
1: +HDMI1 1920/530x1080/300+3840+0 HDMI1
[dukejm@duke-pc ~]$ xrandr-extend -n hdmi
xrandr --auto
xrandr --listmonitors
xrandr --output eDP1 --auto --output HDMI1 --auto --panning 3840x2160+3840+0 --scale 2.0x2.0 --right-of eDP1
Monitors: 2
0: +*eDP1 3840/350x2160/190+0+0 eDP1
1: +HDMI1 3840/530x2160/300+3840+0 HDMI1
Dungeon Master & # 39; s Guide (3.5) p.199 gives the official rules for starting a new character above the 1st level. The most relevant section is under Magic Items as Equipment:
Magic objects created by characters: A PC spell caster created at a level higher than the first level can use any of the XP and GPs you have granted to make magic items, provided it has the exploits and prerequisites for creating objects.
However, advice is also provided on what elements to allow, with particular guidance on how to prevent PCs from spending all their initial wealth with a dominated element.
You are free to limit what magical items characters can choose when they create characters from higher levels, as if you were assigning those items to treasures accumulated in the game. You can exercise a veto item by item, but an easier method is to use a maximum cost for a single item as a limit. (…) You can also limit the characters to a certain type of magic item.
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In the Set Cover problem we need to cover each item at least once.
I am considering the case in which I want each item to be covered at least $ k $ times with constant $ k $.
I consider the classic LP for the problem and random rounding.
Is it true that the modification of the LP of $ geq 1 $ to $ geq k $ in the coverage restriction and with the same rounding (up to the number of repetitions) also works well for this variant?
It seems so, but I'm not sure if I'm missing something.
How are the vertex-disjoint cycle covers of minimum weight of large dense symmetric graphs in real implementations really calculated?
I know that the problem can be reduced to a general coincidence using the Tutte device or the device suggested by Lovasz and Plummer; However, there is a fly in the ointment with those reductions, namely that each vertex of the original graphic is replicated $ O (n) $ times, producing a match problem for a chart with $ O (n ^ 2) $ vertices and therefore a $ O (n ^ 6) $ algorithmic solution
Question:
These are the devices actually used to calculate the lightest D factors and especially the 2 factors or, if the linear programming formulation provides significantly better performance, resp. footprint and, if so, which variant of linear programming is the most appropriate, primal, dual, primal-dual, etc.
I need an efficient way to generate those cylce covers to investigate the performance of a new idea for a heuristic TSH.
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